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- Erdős–Turán_inequality abstract "In mathematics, the Erdős–Turán inequality bounds the distance between a probability measure on the circle and the Lebesgue measure, in terms of Fourier coefficients. It was proved by Paul Erdős and Paul Turán in 1948.Let μ be a probability measure on the unit circle R/Z. The Erdős–Turán inequality states that, for any natural number n,where the supremum is over all arcs A ⊂ R/Z of the unit circle, mes stands for the Lebesgue measure,are the Fourier coefficients of μ, and C > 0 is a numerical constant.".
- Erdős–Turán_inequality wikiPageID "31634990".
- Erdős–Turán_inequality wikiPageRevisionID "597681194".
- Erdős–Turán_inequality subject Category:Inequalities.
- Erdős–Turán_inequality subject Category:Paul_Erdős.
- Erdős–Turán_inequality subject Category:Theorems_in_approximation_theory.
- Erdős–Turán_inequality comment "In mathematics, the Erdős–Turán inequality bounds the distance between a probability measure on the circle and the Lebesgue measure, in terms of Fourier coefficients. It was proved by Paul Erdős and Paul Turán in 1948.Let μ be a probability measure on the unit circle R/Z.".
- Erdős–Turán_inequality label "Erdős–Turán inequality".
- Erdős–Turán_inequality sameAs Erd%C5%91s%E2%80%93Tur%C3%A1n_inequality.
- Erdős–Turán_inequality sameAs Q5385327.
- Erdős–Turán_inequality sameAs Q5385327.
- Erdős–Turán_inequality wasDerivedFrom Erdős–Turán_inequality?oldid=597681194.